Low-energy dynamics in generic potential fields: Hyperbolic periodic orbits and non-ergodicity
Abstract
We prove that, on each low energy level, the natural Hamiltonian system defined by a generic smooth potential on T2 exhibits an arbitrarily high number of hyperbolic periodic orbits and a positive-measure set of invariant tori. Hence, quasi-periodic motion and hyperbolic behavior typically coexist in the low-energy dynamics of natural Hamiltonian systems with two degrees of freedom.
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